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Inverse Operations
Inverse Operations: Divison undoes multiplication. Addition undoes subtraction. Subtraction undoes addition. Multiplication undoes division.
Operations that undo each other include: addition and subtraction multiplication and division powers and roots
Inverse operations, or opposite operations, undo one another. Subtraction undoes addition (and vice versa), and division undoes multiplication (and vice versa).
They are both binary operations. The inverse of adding X to a number is the subtraction of X from the result and, conversely, subtracting Y from a number is the inverse of adding Y to the result.
Inverse Operations
Inverse Operations: Divison undoes multiplication. Addition undoes subtraction. Subtraction undoes addition. Multiplication undoes division.
the Inverse Operation. This answer is relative to math, and operations.
Inverse operations are opposite operations that undo each other. Addition and subtraction are inverse operations. Multiplication and division are inverse operations.
Two operations that undo each other are called inverse operations. Examples are addition and subtraction, or multiplication and division.
Operations that undo each other include: addition and subtraction multiplication and division powers and roots
Addition works by adding numbers together: 2+3=5. Subtraction works by taking numbers away from each other : 3-2=1.
Inverse operations, or opposite operations, undo one another. Subtraction undoes addition (and vice versa), and division undoes multiplication (and vice versa).
They are both binary operations. The inverse of adding X to a number is the subtraction of X from the result and, conversely, subtracting Y from a number is the inverse of adding Y to the result.
because they simply each other
Multiplication and division, Addition subtraction, 144+3-3=144 22*2/2=22. Form, n+x-x=n
Such operations are said to be inverse relations. Examples include: * Addition versus subtraction * Multiplication versus division * Raising to a power vs. taking a root (if you solve for the base) * Raising to a power vs. taking a logarithm (if you solve for the exponent)